共查询到10条相似文献,搜索用时 31 毫秒
1.
Ngaiming Mok 《中国科学A辑(英文版)》2005,(Z1)
We study holomorphic immersions f:X→M from a complex manifold X into a Kahler manifold of constant holomorphic sectional curvature M, i.e. a complex hyperbolic space form, a complex Euclidean space form, or the complex projective space equipped with the Fubini-Study metric. For X compact we show that the tangent sequence splits holomorphically if and only if f is a totally geodesic immersion. For X not necessarily compact we relate an intrinsic cohomological invariant p(X) on X, viz. the invariant defined by Gunning measuring the obstruction to the existence of holomorphic projective connections, to an extrinsic cohomological invariant v(f) measuring the obstruction to the holomorphic splitting of the tangent sequence. The two invariants p(X) and v(f) are related by a linear map on cohomology groups induced by the second fundamental form. In some cases, especially when X is a complex surface and M is of complex dimension 4, under the assumption that X admits a holomorphic projective connection we obtain 相似文献
2.
3.
In this paper we discuss problems of the existence of fixed points of order convex maps. Lemma 1 Let (E,P) be an OBS,Suppose f: S_1→S_1 is a completely continuous map. Then f has fixed points in S_1. Lemma 2 Let (E,P) be an OBS whose positive cone is normal and has nonempty interior. Suppose f: P→P is a continuous, order increasing convex map, f(0)=0; such that. Then there exist a convex subset and a positive number r such that and. 相似文献
4.
Let X be a connected compact polyhedron and let f:X→X be a map.Then theNielsen number N(f) is always a lower bound to MF[f]:=Min{#Fix(g)|g≈f:X→X},the least number of fixed points in the homotopy class.(See [2] or [4].)It is known [1] that if X has no local cut points and X is not a surface ofnegative Euler characteristic,then N(f)=MF[f] for all maps f:X→X.We now 相似文献
5.
In this note, we consider two kinds of map, generalized nonexpansive maps, and get following results.1 The map T: X→X, X weakly compact convex set in a Banach space, satisfying (1) and asymptotic normal condition, then there exist a fixed point in X.2 The map T:X→X is continuous and satisfies (2), where X is the same as, above, then r has an unigue fixed point in X.An example is given to show that the continuity can't be set aside; 相似文献
6.
§ 1.Introduction All maps considered in this paperare continuous.According to the papers of Xiong J.C.and Ye X.D.etal.,the depth of the center of f is atmost2 when f is a map on theunit interval(see[1 ] ) ;at most3 when f is a map on a tree(see[2 ] ) ;at most4 whenf is a map on the Warsaw circle(see[3 ] ) .In this note,an upper bound ofthe depth ofthe center of a map on a class of continua is obtained. By a continuum we mean a compact connected metric space.A subcontinuum is asubset o… 相似文献
7.
We prove that a locally compact ANR-space X is a Q-manifold if and only if it has the Disjoint Disk Property (DDP), all points of X are homological Z∞-points and X has the countable-dimensional approximation property (cd-AP), which means that each map f:K→X of a compact polyhedron can be approximated by a map with the countable-dimensional image. As an application we prove that a space X with DDP and cd-AP is a Q-manifold if some finite power of X is a Q-manifold. If some finite power of a space X with cd-AP is a Q-manifold, then X2 and X×[0,1] are Q-manifolds as well. We construct a countable familyχof spaces with DDP and cd-AP such that no space X∈χis homeomorphic to the Hilbert cube Q whereas the product X×Y of any different spaces X, Y∈χis homeomorphic to Q. We also show that no uncountable familyχwith such properties exists. 相似文献
8.
Consider a discrete time dynamical system x_(k 1)=f(x_k) on a compact metric space M, wheref: M→M is a continuous map. Let h:M→R~k be a continuous output function. Suppose that all ofthe positive orbits of f are dense and that the system is observable. We prove that any outputtrajectory of the system determines f and h and M up to a homeomorphism.If M is a compactAbelian topological group and f is an ergodic translation, then any output trajectory determinesthe system up to a translation and a group isomorphism of the group. 相似文献
9.
Let (X, d) be a bounded metric space and f : X → X be a uniformly continuous surjection. For a given dynamical system (X, f) which may not be compact, we investigate the relation between the asymptotic average shadowing property(AASP), transitivity and mixing. If f has the AASP, then the following statements hold: (1) f n is chain transitive for every positive integer n; (2) If X is compact and f is an expansive homeomorphism, then f is topologically weakly mixing; (3) If f is equicontinuous, then f is topologically weakly mixing; (4) If X is compact and f is equicontinuous, then f ×f is a minimal homeomorphism. We also show that the one-sided shift map has the AASP and the identity map 1 X does not have the AASP. Furthermore, as its applications, some examples are given. 相似文献
10.
Stability of Periodic Orbits and Return Trajectories of Continuous Multi-valued Maps on Intervals 
下载免费PDF全文
下载免费PDF全文 Let I be a compact interval of real axis R, and(I, H) be the metric space of all nonempty closed subintervals of I with the Hausdorff metric H and f : I → I be a continuous multi-valued map. Assume that Pn =(x_0, x_1,..., xn) is a return tra jectory of f and that p ∈ [min Pn, max Pn] with p ∈ f(p). In this paper, we show that if there exist k(≥ 1) centripetal point pairs of f(relative to p)in {(x_i; x_i+1) : 0 ≤ i ≤ n-1} and n = sk + r(0 ≤ r ≤ k-1), then f has an R-periodic orbit, where R = s + 1 if s is even, and R = s if s is odd and r = 0, and R = s + 2 if s is odd and r 0. Besides,we also study stability of periodic orbits of continuous multi-valued maps from I to I. 相似文献